Ruijsenaars wavefunctions as modular group matrix coefficients

Philippe Di Francesco; Rinat Kedem; Sergey Khoroshkin; Gus Schrader; Alexander Shapiro

doi:10.1007/s11005-024-01881-1

Ruijsenaars wavefunctions as modular group matrix coefficients

Lett Math Phys. 2024;114(6):136. doi: 10.1007/s11005-024-01881-1. Epub 2024 Nov 27.

Authors

Philippe Di Francesco^{1

2}, Rinat Kedem¹, Sergey Khoroshkin^{3

4}, Gus Schrader⁵, Alexander Shapiro⁶

Affiliations

¹ University of Illinois Urbana-Champaign, Champaign, IL USA.
² Université Paris Saclay, IPHT, Gif-sur-Yvette, France.
³ National Research University Higher School of Economics, Moscow, Russia.
⁴ Skolkovo Institute of Science and Technology, Skolkovo, Russia.
⁵ Northwestern University, Evanston, IL USA.
⁶ University of Edinburgh, Edinburgh, UK.

Abstract

We give a description of the Hallnäs-Ruijsenaars eigenfunctions of the 2-particle hyperbolic Ruijsenaars system as matrix coefficients for the order 4 element $S \in S L (2, Z)$ acting on the Hilbert space of GL(2) quantum Teichmüller theory on the punctured torus. The GL(2) Macdonald polynomials are then obtained as special values of the analytic continuation of these matrix coefficients. The main tool used in the proof is the cluster structure on the moduli space of framed GL(2)-local systems on the punctured torus, and an $S L (2, Z)$ -equivariant embedding of the GL(2) spherical DAHA into the quantized coordinate ring of the corresponding cluster Poisson variety.

Keywords: Cluster varieties; Ruijsenaars wavefunctions; Spherical DAHA.